A vector coplanar with the non-collinear vectors `bara and bar b` is

Given bara, barb, barc are three non-zero vectors, no two of which are collinear. If the vector (bara + barb) is collinear with barc and (barb + barc) is collinear with bara , then : bara+barb+barc =

If bara,barb and barc be three non-zero vectors, no two of which are collinear. If the vectors bara+2barb is collinear with barc and barb+3barc is collinear with bara , then ( lambda being some non-zero scalar) bara+2barb+6barc is equal to: a) lambdabara b) lambdabarb c) lambdabarc d)0

The scalar triple product of vectors is zero if______a)One of the vectors is zero vectors b)Any two vectors are non-collinear c)Three vectors are non-coplanar d)All of the above

If bara,barb,barc are three non-zero vectors which are pairwise non-collinear. If bara+3barb is collinear with barc and barb+2barc is collinear with bara , then bara+3barb+6barc is: a) barc b) bar0 c) bara+barc d) bara

The vectors bara,barb and bara+barb are

If bara,barb and barc are three non-coplanar vectors, then : (bara + barb + barc) · [(bara + barb) xx (bara + barc)] =

Let barA=(x+4y)bara+(2x+y+1)barb and barB=(y-2x+2)bara+(2x-3y-1)barb , where bara and barb are non-collinear vectors, if 3barA=2barB, then

The vector product of two non-zero vector is zero

If bara,barb,barc be any three non-coplanar vectors, then [bara+barb" "barb+barc" "barc+bara]=

If bara=2barp+3barq-barr,barb=barp-2barq+2barr and barc=-2barp+barq-2barr and barR=3barp-barq+2barr, where barp,barq,barr are non-coplanar vectors, then barR in terms of bara,bar b,barc is